Wittgenstein s Logical Atomism Seminar 8 PHIL2120 Topics in Analytic Philosophy 16 November 2012 1
Admin Required reading for this seminar: Soames, Ch 9+10 New Schedule: 23 November: The Tractarian Test of Intelligibility (Ch 11) 30 November: Logical Positivism on Necessity and Aprioricity 7 December: The Rise and Fall of the Empiricist Criterion of Meaning 14 December: No seminar 2
Ludwig Wittgenstein Wittgenstein was born on April 26, 1889 in Vienna, Austria, to a wealthy industrial family in 1911 he went to Cambridge to study with Bertrand Russell. Tractatus Logico Philosophicus was first published in German in 1921, and then published in English in 1922. In 1920 Wittgenstein, now divorced from philosophy (having, to his mind, solved all philosophical problems in the Tractatus), gave away his part of his family's fortune and pursued several professions (gardener, teacher, architect, etc.) in and around Vienna. It was only in 1929 that he returned to Cambridge to resume his philosophical vocation, after having been exposed to discussions on the philosophy of mathematics and science with members of the Vienna Circle. Died 1951 from cancer Philosophical Investigations was published posthumously in 1953. 3
A useful tool A useful tool to use in determining what facts there are, and what they are like, is the logically perfect language discussed in seminar 4, which I will call L. Let us suppose that: i) L contains a logically proper name for each atomic particular, ii) L contains a predicate for each fundamental property and relation, and iii) L does not contain any other logically proper names or predicates 4
Atomic sentences in L The atomic sentences in L are sentences consisting of a predicate followed by one or more logically proper names. Examples: i) Ra ( a is red ) ii) Lab ( a is to the left of b ) Note: I am assuming for simplicity that redness and to the left of ness are fundamental properties 5
Wittgenstein s theory of facts There are atomic facts Atomic facts are arrangements (or combinations ) fundamental properties and atomic particulars (or atoms, for short) Each true atomic sentence in L expresses (or corresponds to) a fact There are no complex facts (This is different from Russell) 6
The picture theory of meaning Atomic sentences have meaning in a similar way to how pictures have meaning Aspect 1: True atomic sentences represent facts by sharing a common form E.g., Fa 1 a n represents a fact consisting of the property expressed by F and the atoms referred to by `a 1 `a n in virtue of these constituents being arranged in a similar way as `F, `a 1 `a n. 7
The picture theory of meaning (cont) Aspect 2: An atomic sentence S is an meaningful iff it is possible for the atoms and properties named in S to be arranged in a manner corresponding to the way in which the names and predicates in S are arranged. 8
A consequence of the picture theory A meaningful false atomic sentence S need not express an object that is its meaning (such as a proposition or a non obtaining state of affairs) Reason: For S to be meaningful, it need only be possible for the atoms and properties named in S to be arranged in a manner corresponding to the way in which the names and predicates in S are arranged Note: Wittgenstein did not hold that there are any merely possible facts or states of affairs 9
Knowing the meaning of an atomic sentence i) To know the meaning of an atomic sentence is not to be acqainted with some abstract entity, such as a meaning, proposition, or state of affairs. ii) Rather, it is to know what the world would have to be like if the sentence were to be true 10
Truth for atomic sentences An atomic sentence is true iff it corresponds to an atomic fact (An atomic sentence corresponds to a fact iff the atoms and properties named by named in S to be arranged in a manner corresponding to the way in which the names and predicates in S are arranged) 11
Truth for non atomic sentences The truth or falsity of non atomic sentences is always determined by the truth or falsity of atomic sentences. So there is no reason to posit non atomic facts. 12
Example 1: Negation `~Lab is true iff Lab is not true where Lab is not true iff there no fact of a being to the left of b Note: Wittgenstein is rejecting Russell s correspondence principle. 13
Russell s correspondence principle (CP) For any true sentence S, there is a set F of facts that correspondence of S to one or more of the members of F is responsible for the truth of S (CCP) If correspondence to members in F is responsible for the truth of S, then it is impossible for the members of F to exist without S being true Wittgenstein rejected (CP) 14
Example 2: Quantification Suppose F expresses a fundamental property. Then xfx is true iff each sentence of the form Fa expresses a fact The truth of xfx is therefore determined by what atomic facts exist, and there is no reason to postulate any extra general fact to explain the truth of xfx 15
Wittgenstein s theory of possibility i) Each atom and each fundamental property exists necessarily ii) There couldn t be any atoms other than the atoms that actually exist iii) Each atomic sentence in L is possibly true and possibly false iv) Every atomic sentence s compatible with the truth or falsity of any other atomic sentence 16
Wittgenstein s theory of possibility (cont) v) For every set of atomic sentences in L, it is possible that the members of S are all and only the true atomic sentences in L In other words, each such set corresponds to a possible world (or complete way things could be) 17
Why believe Wittgenstein s logical atomism? Wittgenstein gives some deductive arguments for his components of this theory, such as his claims that everything is composed out of atoms. However, Soames argues that these arguments are unpersuasive (see p. 200 3) A better reason for endorsing Wittgenstein s theory is that it is simple and has great explanatory power (wrt, for example, truth, possibility and meaning). 18
Problem 1: Incompatible properties Let R express a particular shade of red, and let B express a particular shade of blue. These properties seem to be fundamental properties. Hence, according to Wittgenstein s logical atomism, Fa and Ba should be compatible with each other. However, this is false, since nothing can be both red and blue 19
Wittgenstein s response Being R and being B are not fundamental properties They are analysable in terms of more fundamental properties But which properties? Maybe physical properties? Prob: Some physical properties raise similar problems, such as being 1g and being 2g, and being 1 m from, and being 2 m from. 20
Consequences of the nature of atoms It apparently follows from this response that sense data can t be atoms, since sense data are coloured. Wittgenstein therefore differs from Russell here. So what are the atoms? 21
Problem 2 (applies to Russell s logical atomism also) Why think there are any facts at all? Why can t there just be particulars and properties. For example, we can say that (1) Lab is true iff a stands in the relation of being to the left of to b This seems to be just as good an explanation as that offered by Russell and Wittgenstein s (2). (2) Lab is true iff the fact of a standing to the left of b exists 22
Problem 2 (cont) Hence, by Occam s razor, we shouldn t believe in facts. Occam s razor: Do not multiply entities beyond necessity (If there is no reason to believe that there are Fs, believe there are no Fs) 23
Problem 2 (cont) More radically: Why not think that all there is is particulars? For example, we can say (3) Lab is true iff a is to the left of b (3) also seems just as good an explanation as that of (1) and (2). Hence, we don t need to postulate either properties or facts. Hence, by Occam s razor, we shouldn t believe in such entities. 24